Kodama Yuji | Department Of Mathematics Clarkson College Of Technology
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概要
関連著者
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Kodama Yuji
Department Of Mathematics Clarkson College Of Technology
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Kodama Yuji
Department Of Electrical Engineering Faculty Of Engineering Science Osaka University
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Kodama Yuji
Institute of Low Temperature Science, Hokkaido University
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Kodama Y
Hokkaido Univ. Sapporo
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KODAMA Yuji
Department of Mathematics,Clarkson College of Technology
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KODAMA Yuji
Department of Physics, Nagoya University : Department of Mathematics, Ohio State University
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KODAMA Yuji
Department of Physics, Nagoya University
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KODAMA Yuji
Department of Physics, Nogoya University
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KODAMA Yuji
Department of Electrical Engineering, Faculty of Engineering Science Osaka University
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Wadati Miki
Institue Of Applied Physics Tsukuba University
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Taniuti Tosiya
Department Of Engineering Natural Science-mathematics Chubu University
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TANIUTI Tosiya
Department of Engineering,Natural Science-Mathematics,Chubu University
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Date Isao
Department Of Neurological Surgery Okayama Graduate School Of Medicine And Dentistry
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Taniuti Tosiya
Department Of Physics Nagoya University
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ISONO Mitsuo
Department of Neurosurgery, Oita Medical University
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NISHINO Hitoo
Department of Physiology, Nagoya City University Medical School
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KOBAYASHI Hidenori
Department of Neurosurgery, Fukui Medical School
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Kobayashi Hidenori
Department Of Civil Engineering Saitama University
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Baba Hiroko
Department Of Molecular Neurobiology Tokyo University Of Pharmacy And Life Science
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Isono Mitsuo
Department Of Brain And Nerve Science Oita Medical University
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Nishino Hitoo
Department Of Neuro-physiology And Brain Science Nagoya City University Graduate School Of Medical S
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Taniuti Toshiya
Department Of Physics Nagoya University
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HlDA Hideki
Department of Neuro-physiology and Brain Science, Nagoya City University Graduate School of Medical
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JUNG Cha-Gyun
Department of Neuro-physiology and Brain Science, Nagoya City University Graduate School of Medical
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Kobayashi Hidenori
Department Of Neurosurgery Oita University Faculty Of Medicine
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Hlda Hideki
Department Of Neuro-physiology And Brain Science Nagoya City University Graduate School Of Medical S
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Jung Cha-gyun
Department Of Neuro-physiology And Brain Science Nagoya City University Graduate School Of Medical S
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Kodama Yuji
Department Of Mathematics The Ohio State University
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Kodama Yuji
Department Of Neurosurgery Oita University Faculty Of Medicine
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Kodama Yuji
Department Of Physics Nagoya University
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Kodama Yuji
Department Of Physics Nagoya University:department Of Mathematics Clarlson College Of Technology
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Kodama Yuji
Department Of Physics Nagoya University:department Of Mathematics Clarkson College Of Technology
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Kodama Yuji
Department Of Physics Nogoya University
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Maekawa Toru
Department Of Gastroenterology Kanebo Memorial Hospital
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YE JIAN
Department of Mathematics, The Ohio State University
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AOYAMA Shogo
Department of Physics, Nagoya University
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Ye Jian
Department Of Mathematics The Ohio State University
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Ye Jian
Department Of Materials Science And Engineering The Ohio State University
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Aoyama Shogo
Department Of Physics Nagoya University
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Taniuchi Toshiya
Department Of Physics Nagoya University
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Kobayashi Hidenori
Department Of Brain And Nerve Science Oita Medical University
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Yamada Kazuo
Department Of Architecture Faculty Of Engineering Aichi Institute Of Technoligy
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Wadati Miki
Institute For Optical Research Kyoiku University
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Kodama Yuji
Department Of Mechanical Engineering Toyo University
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Wadati Miki
Institute for Optical Research, Kyoiku University
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Jung Cha-Gyun
Department of Alzheimer's Disease Research, Research Institute, National Center for Geriatrics and Gerontology (NCGG)
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Ye Jian
Department of Applied Physics and Quantum-Phase Electronics Center, The University of Tokyo
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Yamada Kazuo
Department of Applied Molecular Chemistry, College of Industrial Technology, Nihon University
著作論文
- Higher Order Approximation in the Reductive Perturbation Method. III. : The Weakly Dissipative System
- Higher Order Approximation in the Reductive Perturbation Method.I.The Weakly Dispersive System
- High Titer Retroviral Gene Transduction to Neural Progenitor Cells for Establishment of Donor Cells for Neural Transplantation to Parkinsonian Model Rats
- THE GENERALIZED TODA LATTICE EQUATION ON SEMISIMPLE LIE ALGEBRAS
- Wave Propagation in Nonlinear Lattice. III
- Higher Order Approximation in the Reductive Perturbation Method.I.The Strongly Dispersive System
- A Canonical Transformation for the Sine-Gordon Equation
- Theory of Canonical Transformations for Nonlinear Evolution Equations. II
- Soliton Creation-Annihilation Operators as the Canonical Transformation
- A Canonical Transformation for Equation of the Form φ_=h(φ)
- Scaling Law in Electronic Tunnelling Phenomena
- Higher Order Approximation in the Reductive Perturbation Method for the Weakly Dispersive System (Theory of Nonlinear Waves)